Difference between revisions of "Polylogarithm"
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− | The polylogarithm $\mathrm{Li}_s$ is defined by the formula | + | The polylogarithm $\mathrm{Li}_s$ is defined by the formula for $|z|<1$ by |
$$\mathrm{Li}_s(z) = \sum_{k=1}^{\infty} \dfrac{z^k}{k^s} = z + \dfrac{z^2}{2^s} + \dfrac{z^3}{3^s} + \ldots$$ | $$\mathrm{Li}_s(z) = \sum_{k=1}^{\infty} \dfrac{z^k}{k^s} = z + \dfrac{z^2}{2^s} + \dfrac{z^3}{3^s} + \ldots$$ | ||
A special case of the polylogarithm with $s=2$ is called a [[dilogarithm]]. | A special case of the polylogarithm with $s=2$ is called a [[dilogarithm]]. |
Revision as of 16:36, 20 June 2016
The polylogarithm $\mathrm{Li}_s$ is defined by the formula for $|z|<1$ by $$\mathrm{Li}_s(z) = \sum_{k=1}^{\infty} \dfrac{z^k}{k^s} = z + \dfrac{z^2}{2^s} + \dfrac{z^3}{3^s} + \ldots$$ A special case of the polylogarithm with $s=2$ is called a dilogarithm.
Videos
Properties
Lerch transcendent polylogarithm
Legendre chi in terms of polylogarithm